Abstract
By providing instances of approximation of linear diffusions by birth-death processes, Feller [Fel50] has offered an original path from the discrete world to the continuous one. In this paper, by identifying an intertwining relationship between squared Bessel processes and some linear birth-death processes, we show that this connection is in fact more intimate and goes in the two directions. As by-products, we identify some properties enjoyed by the birth-death family that are inherited from squared Bessel processes. For instance, these include a discrete self-similarity property and a discrete analogue of the beta-gamma algebra. We proceed by explaining that the same gateway identity also holds for the corresponding ergodic Laguerre semi-groups. It follows again that the continuous and discrete versions are more closely related than thought before, and this enables to pass information from one semi-group to the other one.
Reference
Laurent Miclo, and Pierre Patie, “On a gateway between continuous and discrete Bessel and Laguerre processes”, The Annales Henri Lebesgue , vol. 2, June 2019, pp. 59–98.
See also
Published in
The Annales Henri Lebesgue, vol. 2, June 2019, pp. 59–98